Just a note about using the submitted codes below..
Their functions have an optional $precision parameter; however, it's not being used properly..
BCMath functions by default do not use decimal precision unless specified by BCScale($precision); or using the extra parameter in the used BC functions.
For example, a blank PHP file with their code.. executing BCExp('5.7'); returns "47" instead of the correct answer of "298.86740096706..."
So for optimum accuracy, I'd suggest setting BCScale to a healthy length before running their codes.
exp
(PHP 4, PHP 5)
exp — Calculates the exponent of e
Описание
float exp ( float $arg )
Returns e raised to the power of arg .
Замечание: 'e' is the base of the natural system of logarithms, or approximately 2.718282.
Список параметров
- arg
-
The argument to process
Возвращаемые значения
'e' raised to the power of arg
Примеры
Пример #1 exp() example
<?php
echo exp(12) . "\n";
echo exp(5.7);
?>
Результат выполнения данного примера:
1.6275E+005 298.87
User Contributed Notes
exp
exp
Nitrogen
24-Sep-2009 12:54
24-Sep-2009 12:54
konrad
24-Jan-2007 11:13
24-Jan-2007 11:13
working version (checked) of below code is
<?php
// see bccomp for this code (signed and unsigned zero!)
function bccomp_zero($amount) {
return bccomp($amount, (@$amount{0}=="-"?'-':'').'0.0');
}
// arbitrary precision function (x^n)/(n)!
function bcpowfact($x, $n) {
if (bccomp_zero($n) == 0) return '1';
if (bccomp($n, '1') == 0) return $x;
$a = $x; // 1st step: a *= x / 1
$i = $n;
while (bccomp($i, '1') == 1) {
// ith step: a *= x / i
$a = bcmul($a, bcdiv($x, $i));
$i = bcsub($i, '1'); // bc idiom for $i--
}
return $a;
}
// arbitrary precision exp() function
function bcexp($x, $digits) {
$sum = $prev_sum = '0.0';
$error = '0.'.str_repeat('0', $digits-1).'1'; // 0.1*10^-k
$n = '0.0';
do {
$prev_sum = $sum;
$sum = bcadd($sum, bcpowfact($x, $n));
$n = bcadd($n, '1'); // bc idiom for $n++
} while (bccomp(bcsub($sum, $prev_sum), $error) == 1);
return $sum;
}
?>
boards at gmail dot com
26-Apr-2006 05:18
26-Apr-2006 05:18
Note regarding the mathematical function exp(x):
To continue accuracy of the exponential function to an infinite amount of decimal places, one would use the power series definition for exp(x).
(in LaTeX form:)
e^x = \sum_{n=0}^{\infty} \frac{x^n}{n!}
So, to do that in PHP (using BC math):
<?php
// arbitrary precision function (x^n)/(n)!
function bcpowfact($x, $n) {
if (bccomp($n, '0') == 0) return '1.0';
if (bccomp($n, '1') == 1) return $x;
$a = $x; // nth step: a *= x / 1
$i = $n;
while (bccomp($i, '1') == 1) {
// ith step: a *= x / i
$a = bcmul($a, bcdiv($x, $i));
$i = bcsub($i, '1'); // bc idiom for $i--
}
return $a;
}
// arbitrary precision exp() function
function bcexp($x, $decimal_places) {
$sum = $prev_sum = '0.0';
$error = bcdiv(bcpow('10', '-'.$decimal_places), 10); // 0.1*10^-k
$n = '0';
do {
$prev_sum = $sum;
$sum = bcadd($sum, bcpowfact($x, $n));
}
while (bccomp(bcsub($sum, $prev_sum), $error) == 1);
return $sum;
}
?>
info at teddycaddy dot com
16-Sep-2004 01:55
16-Sep-2004 01:55
This only returns the first 51 digits after the decimal point.